Author(s)

Neda Bagheri¹, Hassan Karnameh Haghighi²

¹Faculty of Mathematical and Finance, Sheikhbahaee University, Isfahan, Iran.
²Faculty of Management, Sheikhbahaee University, Isfahan, Iran.

This paper will focus on pricing options in marketing with two basic assets with risk and one basic asset without risk. In so doing, the Black-Scholes model and the European options which is applicable at the due date were used. By investigating the European option to find the proper price, it is necessary to solve an equation with partial derivatives which has two spatial variables. The finite differences will be used for such equations. Finite differences for one dimensional equations commonly ends in a three diagonal set which will be solved by calculation costs O(n) in which n is the number of discrete points. But here, since the problems are two dimensional, the Alternating Direction Implicit (ADI) and Locally One-Dimensional (LOD) are used to reduce the calculation costs. The open cost is at the level of discrete points and this is the advantage of these methods. Moreover, these methods enjoy acceptable stability. Though ADI and LOD are equal and easy in calculations, evaluating these methods in pricing the option indicates that the ADI method is sensitive to discontinuity or non-derivation which is the common property of income function; therefore, this thesis proposes the LOD method.

Black-Scholes Equation, ADI, LOD, Option Pricing, Finite Difference Method

Bagheri, N. and Haghighi, H. (2017) A Comparison Study of ADI and LOD Methods on Option Pricing Models. Journal of Mathematical Finance, 7, 275-290. doi: 10.4236/jmf.2017.72014.